Sharp growth of the Ornstein-Uhlenbeck operator on Gaussian tail spaces

Abstract

Let X be a standard Gaussian random variable. For any p ∈ (1, ∞), we prove the existence of a universal constant Cp>0 such that the inequality (E |h'(X)|p)1/p ≥ Cp d (E |h(X)|p)1/p holds for all d≥ 1 and all polynomials h : R C whose spectrum is supported on frequencies at least d, that is, E h(X) Xk=0 for all k=0,1, …, d-1. As an application of this optimal estimate, we obtain an affirmative answer to the Gaussian analogue of a question of Mendel and Naor (2014) concerning the growth of the Ornstein-Uhlenbeck operator on tail spaces of the real line. We also show the same bound for the gradient of analytic polynomials in an arbitrary dimension.